Microscopic Aspects of Nonlinearity in Condensed MatterAlan R. Bishop, V.L. Pokrovsky, V. Tognetti Major topics addressed in the proceedings of the inaugural Conference of the Institute of Theoretical Physics at the U. of Florence, June 1990, include complexity and coherence in spin glasses, associative distributive memory, low dimensional electronic materials, magnets, Josephson junction arrays, |
From inside the book
Try this search over all volumes: connecting cross
Results 1-0 of 0
Contents
Space Time Complexity in Quantum Optics | 1 |
Critical Phenomena in Hamiltonian Chaos | 19 |
Statistical Properties of the Transition to Spatiotemporal Chaos | 45 |
Copyright | |
27 other sections not shown
Other editions - View all
Microscopic Aspects of Nonlinearity in Condensed Matter Alan R. Bishop,V.L. Pokrovsky,V. Tognetti Limited preview - 2012 |
Microscopic Aspects of Nonlinearity in Condensed Matter Alan R. Bishop,V.L. Pokrovsky,V. Tognetti No preview available - 2012 |
Common terms and phrases
adiabatic amplitude approximation Aspects of Nonlinearity atoms band behavior bifurcation bipolaronic Born-Oppenheimer approximation calculation chain chaos chaotic classical Condensed Matter consider correlation corresponding Coulomb coupling critical curve d-wave defect defined density dependence described diagram dimensional domain wall dynamics effects electron equation experimental exponential Fermi fermion field finite fluctuations free energy frequency function Gibbs free energy Green function Hamiltonian integral interaction kink lattice Lett limit Lovesey magnetic Microscopic Aspects mode modulation motion Nonlinearity in Condensed obtained optical order parameter oscillations pair particle perturbation phase transition phonon Phys Physics polaron potential problem properties quantum mechanical region renormalization resonance scale shown in Fig simulation solitons solution space spatial spectrum spin stable fixed points statistical structure superconducting symmetry temperature theory thermodynamic tunneling unstable variables velocity vertex models wave zero